For a general statistical model, we introduce the notion of data dependent measure (DDM) on the model parameter. Typical examples of DDM are the posterior distributions. Like for posteriors, the quality of a DDM is characterized by the contraction rate which we allow to be local, i.e., depending on the parameter. We construct confidence sets as DDM-credible sets and address the issue of optimality of such sets, via a trade-off between its "size" (the local radial rate) and its coverage probability. In the mildly ill-posed inverse signal-in-white-noise model, we construct a DDM as empirical Bayes posterior with respect to a certain prior, and define its (default) credible set. Then we introduce éxcessive bias restriction' (EBR), more general than 'self-similarity' and 'polished tail condition' recently studied in the literature. Under EBR, we establish the confidence optimality of our credible set with some local (oracle) radial rate. We also derive the oracle estimation inequality and the oracle DDM-contraction rate, non-asymptotically and uniformly in . The obtained local results are more powerful than global: adaptive minimax results for a number of smoothness scales follow as consequence, in particular, the ones considered by Szabo, van der Vaart and van Zanten (2015).
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